Programmable Fractional Charge Pump For DC-DC Converter

ABSTRACT

A charge pump provides a programmable multiplication factor for generating an output voltage. A first output voltage may be generated by connecting a first plurality of N capacitors in a first plurality of (N+1) configurations. A second output voltage may be generated by connecting a second plurality of M capacitors in a second plurality of M+1 configurations. The first plurality of N capacitors and the second plurality of M capacitors have one or more capacitors in common. The integers M and N may be equal, although this is not required. The first plurality of configurations is different than the second plurality of configurations, thereby providing different multiplication factors for the first and second pluralities of configurations. In one embodiment, the first plurality of (N+1) configurations results in an output voltage of about ¾× an input voltage.

RELATED APPLICATIONS

This is a continuation-in-part of pending U.S. patent application Ser. No. 11/678,048 filed Feb. 22, 2007, and entitled “Fractional Charge Pump For Step Down DC-DC Converter”, by Sorin S. Georgescu, Anthony G. Russell and Chris Bartholomeusz, which is a continuation-in-part of pending U.S. patent application Ser. No. 11/264,884 filed Nov. 1, 2005, and entitled, “LED Bias Current Control Using Adaptive Fractional Charge Pump” by Sorin S. Georgescu, Anthony G. Russell and Chris Bartholomeusz.

BACKGROUND OF THE INVENTION

1. Field of the Invention

The invention relates to the field of electronic circuits, and in particular, to an efficient, low noise fractional charge pump.

2. Related Art

Most portable electronic devices contain digital and analog circuits operating at 2.5 Volts or below. However, the battery power used in such devices generally provides a supply voltage that is above the operating voltage of these devices (typically around 3.6 V). For example, a modern rechargeable lithium ion or lithium polymer battery is typically rated to have a nominal output voltage of 3.7 V, but may actually provide a voltage in the range of 2.7 to 4.2 V, depending on the charge state of the battery.

This variability in battery supply voltage necessitates circuitry to step down the supply voltage to the acceptable level. One of the common schemes is to use a charge pump with multiple capacitors. A charge pump can have 2 capacitors equally dividing the battery voltage.

An implementation of such type of charge pump is known as a “½×” charge pump. FIGS. 1A and 1B are schematic diagrams of a conventional ½× charge pump 100, which receives an input voltage V_IN1 and provides a reduced output voltage V_OUT1 to a load D140. Charge pump 100 includes an input terminal 101, charging capacitors C110 and C120, a storage capacitor C130, and an output terminal 102. While not shown for clarity, charge pump 100 also includes interconnect circuitry for connecting capacitors C110 and C120 in the configurations shown in FIGS. 1A and 1B.

Charge pump 100 operates by switching between the two phases of operation shown in FIGS. 1A and 1B. In FIG. 1A, a charging phase is shown, in which capacitors C110 and C120 are serially connected between input terminal 101 and ground, while capacitor C130 is connected between ground and output terminal 102 (load D140 is always connected between output terminal 102 and ground). During this charging phase, capacitors C110 and C120 are charged by input voltage V_IN1 to voltages V11 and V12. Under steady state conditions, capacitors C110 and C120 will both be charged to half of input voltage V_IN1 during this charging phase. Meanwhile, a voltage V13 stored on capacitor C130 is provided as output voltage V_OUT1 for driving load D140.

Then, in a discharging phase shown in FIG. 1B, capacitors C110 and C120 are connected in parallel between input terminal 101 and output terminal 102. Specifically, the positive plate (marked with a triangular indicator) of capacitor C110 is connected to input terminal 101, while the negative plate (unmarked) of capacitor C110 is connected to output terminal 102. Likewise, during the discharging phase, the positive plate (marked) of capacitor C120 is connected to the input terminal 101, while the negative plate (unmarked) of capacitor C120 is connected to output terminal 102.

Because capacitors C110 and C120 are inverted and connected in parallel after input terminal 101, the output voltage V_OUT1 provided during the discharging phase shown in FIG. 1B is equal to the difference of input voltage V_IN1 and the average of voltages V11 and V12 on capacitors C110 and C120, respectively. As described above with respect to FIG. 1A, both capacitors C110 and C120 are charged to half of input voltage V_IN1 during the charging phase. Therefore, the output voltage V_OUT1 provided during the discharging phase is simply equal to one half of input voltage V_IN1 (i.e., 0.5*V_IN1).

Therefore, the output voltage range of ½× charge pump 100 is between 1.35 V and 2.1 V when provided with a lithium ion battery voltage (i.e., 2.7 V to 4.2 V) as in input voltage.

As portable devices become increasingly advanced while at the same time shrinking in size, power efficiencies must continually be improved. While ½× charge pump 100 can provide a reduced supply voltage of half the battery voltage, the battery voltage can vary significantly, thereby resulting in significant variation in the reduced supply voltage. For example, the output voltage range of ½× charge pump 100 is between 1.35 V and 2.1 V when provided with a nominal 3.7 Volt lithium ion battery having a voltage range of 2.7 V to 4.2 V as an input voltage. In this case, the desired nominal output voltage is about 1.85 V. Thus, the output voltage provided by ½× charge pump 100 may be significantly below the desired nominal output voltage. In this case, the available battery charge is small and the efficiency is also small. For this reason, ½× charge pump 100 is not ideally suited for use in all applications.

It would therefore be desirable to have a charge pump capable of applying a multiplication factor greater than ½× and less than 1× to an input voltage. It would also be desirable to have a system and method for stepping down a supply voltage that maximizes power efficiency while minimizing die area requirements.

SUMMARY OF THE INVENTION

Accordingly, the present invention provides a charge pump that applies a ⅔× voltage scaling factor, rather than the conventional 1/1× or ½× scaling factors. As a result, an optimum output voltage can be achieved for a given input voltage, which can beneficially improve power efficiency in situations where conventional charge pumps provide excessive or insufficient voltage multiplication.

In one embodiment, a ⅔× charge pump can include first, second, and third capacitors, with the third capacitor connected between the output terminal of the charge pump and ground. The first and second capacitors are connected in three different connections to the input terminal of the charge pump during three different phases of operation to provide the 2/3× multiplier function.

In a charging phase, the first and second capacitors are connected in series between the input terminal and ground, so that the output terminal is driven by the charge stored on the third capacitor. In a first discharging phase, the output terminal is connected to the common node of the first and second capacitors connected in series, so that the voltage provided at the output terminal is the difference of the input voltage and the voltage across the first capacitor.

Finally, in a second discharging phase, the first and second capacitors are connected between the input terminal and the output terminal, with the first capacitor inverted relative to the input terminal, and the second capacitor having the same orientation as during the charging phase, but connected between the first capacitor and the output terminal. Therefore, the output voltage provided during the second discharging phase is equal to the sum of the input voltage and the voltage potential across the first capacitor, minus the voltage potential across the second capacitor.

By operating the charge pump in this manner, the average voltages on the first and second charge pumps will be one third and two thirds, respectively, of the input voltage, thereby causing the average output voltage provided by the charge pump to be equal to 0.66 times the input voltage.

In accordance with another embodiment, a ¾× charge pump may be implemented by configuring two capacitors to have three different configurations in three operating phases. A 7/10× charge pump may also be implemented by configuring three capacitors in four operating phases. In addition, a 7/6× charge pump may be implemented by configuring three capacitors to have four different configurations in four operating phases. This 7/6× charge pump is helpful for the case where the battery voltage drops below the necessary output voltage and a 3/2 mode does not provide high enough efficiency. A methodology for identifying charge pumps with other multiplication factors is also provided, wherein N capacitors are configured in (N+1) different configurations in (N+1) corresponding operating phases. In accordance with another embodiment, a programmable charge pump is provided, wherein the multiplication factor can be selected to have different values by controlling the switching of capacitors of the charge pump.

The invention will be more fully understood in view of the following description and drawings.

BRIEF DESCRIPTION OF THE DRAWINGS

FIGS. 1A and 1B are schematic diagrams of the operation of a conventional ½× charge pump.

FIGS. 2A, 2B, and 2C are schematic diagrams of the operation of a reduced area ⅔× charge pump, in accordance with an embodiment of the invention.

FIG. 3 is a schematic diagram of an exemplary switch configuration for the charge pump of FIGS. 2A-2C.

FIG. 4 is a block diagram of an electronic device that incorporates the charge pump of FIGS. 2A-2C.

FIGS. 5 and 6 are schematic diagrams of discharge phases of a ⅔× charge pump in accordance with alternate embodiments of the present invention.

FIGS. 7A, 7B and 7C are circuit diagrams that illustrate three operating phases of a ¾× charge pump, in accordance with another embodiment of the present invention.

FIGS. 8A, 8B, 8C and 8D are circuit diagrams that illustrate four operating phases of a 7/10× charge pump, in accordance with another embodiment of the present invention.

FIGS. 9A, 9B, 9C and 9D are circuit diagrams that illustrate four operating phases of a 7/6× charge pump, in accordance with another embodiment of the present invention.

FIG. 10 is a circuit diagram of a programmable charge pump, which can be configured to implement a ⅔×, ¾×, 7/10, or 7/6× charge pumps in accordance with another embodiment of the present invention.

DETAILED DESCRIPTION

Conventional charge pumps can generate output voltages that are higher or lower than necessary for many applications. Excess voltage gain must then be attenuated, which results in wasted power (and reduced battery life for devices incorporating conventional charge pumps). Insufficient voltage gain results in low operating efficiency. By providing a charge pump that applies a ⅔× voltage scaling factor, rather than the conventional 1/1 or 1/2 scaling factors, an optimum output voltage can be achieved for a given input voltage, which can beneficially improve power efficiency in situations where conventional charge pumps provide either excessive or insufficient voltage.

FIGS. 2A, 2B, and 2C are schematic diagrams of an embodiment of a ⅔× charge pump 200 for receiving an input voltage V_IN2 and providing a lower output voltage V_OUT2 to a load D240 (depicted as an LED for exemplary purposes). Charge pump 200 includes an input terminal 201, charging capacitors C210 and C220, a storage (output) capacitor C230, and an output terminal 202. Charge pump 200 also includes interconnect circuitry 205 (e.g., wiring, switches, control logic) for wiring (i.e., providing the electrical paths between) capacitors C210, C220, and C230 in the configurations shown in FIGS. 2A, 2B, and 2C. An exemplary switching configuration for interconnect circuitry is described below with respect to FIG. 3.

Charge pump 200 operates by switching between the three phases of operation shown in FIGS. 2A, 2B, and 2C. In FIG. 2A, a charging phase is shown, in which capacitors C210 and C220 are serially connected between input terminal 201 and ground. Meanwhile, capacitor C230 is connected between ground and output terminal 202 (load D240 is always connected between output terminal 202 and ground). Note that “ground” can refer to any supply voltage lower than input voltage V_IN2, such that capacitor C230 and load D240 are connected between output terminal 202 and a lower supply voltage terminal (not shown for clarity). In alternate implementation, this charging phase can be omitted as charging can be done also during a subsequent discharge phase.

During the charging phase, capacitors C210 and C220 are charged by input voltage V_IN2 to voltages V21 and V22, while a voltage V23 stored on capacitor C230 is provided as output voltage V_OUT2 for driving load D240. Note that because capacitors C210, C220, and C230 are always either charging or discharging, voltages V21, V22, and V23 are actually average voltages. However, so long as the different operational phases are short enough, the actual changes in voltages V21, V22, and V23 during each phase will be relatively small. Therefore, for descriptive and analytical purposes, voltages V21, V22, and V23 can be considered to be essentially constant.

In the first discharging phase shown in FIG. 2B, capacitor C210 and capacitor C220 remain connected in series between input terminal 201 and ground. However, the common node of capacitors C210 and C220 is connected to output terminal 202. Under these conditions, the potential across capacitor C210 generated during the charging phase is therefore subtracted from the input voltage V_IN2 to generate output voltage V_OUT2 during the first discharging phase shown in FIG. 2B. Thus, during the first discharging phase, output load D240 is driven by, and storage capacitor C230 is charged by, the difference of input voltage V_IN2 and voltage V21 on capacitor C210 (i.e., V_OUT2=V_IN2−V21).

Then, in the second discharging phase shown in FIG. 2C, capacitors C210 and C220 are connected in series between input terminal 201 and output terminal 202, with the orientation of capacitor C210 being inverted compared to the previous discharge phase of FIG. 2B. Specifically, the positive plate (marked with a triangular indicator) of capacitor C210 is connected to the positive plate of capacitor C220, while the negative plate of capacitor C210 is connected to the input terminal 201. The negative plate of capacitor C220 is connected to the output terminal 202. Therefore, during the second discharging phase depicted in FIG. 2C, output voltage V_OUT2 is equal to the sum of input voltage V_IN2 and the voltage V21 across capacitor C210, minus the voltage V22 across capacitor C220 (i.e., V_OUT2=V_IN2+V21−V22). This output voltage V_OUT2 then drives load D240 and charges storage capacitor C230. The process then switches back to the charging phase of FIG. 2A and continues cycling in this manner to provide the desired charge pumping action.

Note that unlike conventional charge pumps (e.g., ½× charge pump 100 of FIGS. 1A-1B), ⅔× charge pump 200 includes three distinct operational phases (as described with respect to FIGS. 2A-2C). Those three phases cause capacitors C210 and C220 to exhibit different nominal voltage potentials (i.e., voltages V21 and V22 will not be equal), and that difference in voltage levels determines the nominal value for output voltage V_OUT2.

To calculate the nominal values for voltages V21 and V22, Kirchoff's Second Law (conservation of voltage) can be used to generate voltage equations for the three phases of operation. Those equations can then be solved for voltages V21 and V22 to determine the relationship between those two voltages. For the charging phase (FIG. 2A), Kirchoff's Second Law states that: V_IN2=V21+V22  [Eqn. 1] For the first discharging phase (FIG. 2B), Kirchoff's Second Law states that: V_OUT2=V_IN2−V21  [Eqn.2] As described above with respect to FIG. 2B, the orientation of capacitor C210 with respect to input terminal 201 during the first discharging phase is inverted from the charging phase to the first discharging phase. Therefore, the voltage potential stored across capacitor 210 during the charging phase is subtracted from the input voltage V_IN2 during the first discharging phase.

Finally, for the second discharging phase (FIG. 2C), Kirchoff's Second Law states that: V_OUT2=V_IN2+V21−V22  [Eqn. 3] As described above with respect to FIG. 2C, capacitor C210 is connected with a reversed orientation with respect to input terminal 201 during the second discharging phase. Therefore, the voltage potential (V21) across capacitor C210 is added to input voltage V_IN2. However, during the second discharging phase, the orientation of capacitor C220 is same as the orientation during the charging phase. Therefore, the voltage potential (V22) across capacitor C220 is subtracted from the input voltage V_IN2 during the second discharging phase.

Substituting Equation 2 into Equation 3 yields: V_IN2−V21=V_IN2+V22  [Eqn. 4] which reduces to the following: V22=2*V21  [Eqn. 5] Thus, the voltage potential across capacitor C220 (i.e., voltage V22) is twice the magnitude of the voltage potential across capacitor C210 (i.e., voltage V21). Substituting Equation 5 into Equation 1 then yields: V21=(⅓*V_IN2  [Eqn. 6] Finally, substituting Equation 6 into Equation 2 yields the following for output voltage V OUT2: V_OUT2=(⅔*V_IN2  [Eqn. 7] Note that the same result can be derived by substituting Equations 5 and 6 into Equation 3. In either case, charge pump 200 provides a voltage multiplication factor of ⅔.

FIG. 3 shows ⅔× charge pump 200 including an embodiment of interconnect circuitry 205 that includes switches S205(1), S205(2), S205(3), S205(4), S205(5), S205(6), and S205(7). Switches S205(1), S205(2) and S205(6) are connected in series between input terminal 201 and output terminal 202, with the positive plate of capacitor C210 being connected to the junction between switches S205(1) and S205(2). Switch S205(3) is connected between input terminal 201 and the negative plate of capacitor C210, while switch S205(4) is connected between the negative plate of capacitor C220 and the output terminal 202. Switch S205(5) is connected between the negative plate of capacitor C210 and the positive plate of capacitor C220, and switch S205(6) is connected between the positive plate of capacitor C220 and output terminal 202. Finally, switch S205(7) is connected between the negative plate of capacitor C220 and ground.

Thus, during the charging phase, switches S205(1), S205(5), and S205(7) are closed, while the remainder of switches S205 are open, thereby allowing charging of capacitors C210 and C220 as shown in FIG. 2A. Then, during the first discharging phase, switches S205(1), S205(5), S205(7) and S205(6) are closed, and the remainder of switches S205 are opened, thereby connecting capacitors C210 and C220 as shown in FIG. 2B. Note that switch S205(7) can be either open or closed during the first discharging phase, as grounding the negative plate of capacitor C220 during this phase will have no effect on the average charge stored on capacitor C220. Finally, during the second discharging phase, only switches S204(3), S205(2), and S205(4) are closed, thereby connecting capacitors C210 (non-inverted) and C220 (inverted) between input terminal 201 and output terminal 202, as shown in FIG. 2C.

Note further that various other switching configurations can be used to provide additional voltage multiplication factors. For example, by changing the second discharge phase to connect the positive plate of capacitor C220 directly to input terminal 201 and the negative plate of capacitor C220 to output terminal 202, a ½× multiplication factor is obtained. In this case, capacitor C220 obtains the same charge and voltage as capacitor C210 during the first discharge phase. Thus, during the first discharge phase, V_OUT2 is equal to V_IN2 minus V21; and during the second discharge phase, V_OUT2 is equal to V_IN2 minus V22. It therefore follows that V21 is equal to V22, which is equal to V_IN2/2.

Note that due to switch resistance within charge pump 200, output voltage V_OUT2 may not precisely reach ⅔ of input voltage V_IN2. For example, if the combined switch resistance (open loop) across charge pump 200 is 1 ohm during each operational phase, a 100 mA load (D240) and an input voltage V_IN2 equal to 3 V will result in an output voltage V_OUT2 equal to 2.5 V (i.e., 2.5 V=(⅔*3.9 V)−(1Ω*0.1 A)), rather than the ideal output voltage value of 2.6 V (i.e., 2.6 V=⅔*3.9 V). Therefore, reducing the switch resistance within charge pump 200 can allow output voltage V_OUT2 to more closely approach the ideal ⅔ multiple of input voltage V_IN2. Note that this does not change the fact that charge pump 200 is a ⅔× charge pump, since the rating of a charge pump is based on operation under ideal conditions (i.e., no losses due to switch resistance, no load, and steady state operation). In general, any circuit incorporating charge pump 200 will operate properly so long as output voltage V_OUT2 provided by charge pump 200 is substantially equal to ⅔ times input voltage V_IN2 (e.g., voltage V_OUT2 is within 5% of ⅔ times voltage V_IN2).

By providing a ⅔× voltage multiplication factor, charge pump 200 can beneficially provide enhanced power efficiency over conventional ½× charge pumps (i.e., charge pump 100 shown in FIGS. 1A and 1B. For example, FIG. 4 shows a block diagram of a battery-powered device 300 that includes a battery 310, ⅔× charge pump 200, and load circuit 240. Device 300 could, for example, be a cell phone, a personal digital assistant, a portable multimedia device, a digital camera, a video camera, or any other device. Battery 310 can be any type of battery, such as a lithium ion or lithium polymer rechargeable battery providing a nominal voltage VBATT of 3.7 V, with an actual output voltage range between 3.0 V and 4.2 V (other types (and any number) of batteries, such as nickel metal hydride (NiMH) rechargeable or alkaline or lithium primary (non-rechargeable) batteries, among others, could also be used). Note that the particular arrangement (order) of elements within device 300 is purely exemplary, and various other arrangements will be readily apparent.

In alternate embodiments of the present invention, a ⅔ voltage multiplication factor can also be achieved by modifying the first discharging phase of FIG. 2B in the manner described below in connection with FIGS. 5 and 6.

FIG. 5 is a circuit diagram illustrating the connection of capacitors C210 and C220 in a first discharging phase in accordance with an alternate embodiment of the present invention. The configuration of FIG. 5 replaces the configuration of FIG. 2B in this embodiment. As illustrated in FIG. 5, capacitor C210 is connected in series between the input terminal 201 and the output terminal 202 (while capacitor C220 is disconnected from both of these terminals 201-202). Under these conditions, the output voltage V_OUT2 has a value of ⅔ V_IN2 because capacitor C210 is connected with the same orientation as in the charging phase of FIG. 2A. As a result, the average output voltage V_OUT2 remains at a value of ⅔ V_IN2.

FIG. 6 is a circuit diagram illustrating the connection of capacitors C210 and C220 in a first discharging phase, in accordance with yet another embodiment of the present invention. The configuration of FIG. 6 replaces the configuration of FIG. 2B in this embodiment. As illustrated in FIG. 6, capacitor C220 is connected in series between the ground terminal and the output terminal 202, with an orientation that is opposite the orientation of the charging phase of FIG. 2A. Capacitor C210 is de-coupled from the output terminal 202. As a result, capacitor C220 discharges to the output terminal 202, thereby causing the output voltage V_OUT2 to have a value of ⅔ V_IN2. As a result, the average output voltage V_OUT2 remains at a value of two thirds V_IN2.

In accordance with yet another embodiment of the present invention, the charging phase of FIG. 2A is eliminated, and circuit 300 operates by switching between the configurations of FIGS. 2B and 2C. In this embodiment, capacitors C210 and C220 are charged while circuit 300 is in the configuration of FIG. 2B. At this time, the output voltage V_OUT2 achieves a value of ⅔ V_IN2 (as described above in connection with FIG. 2B). When circuit 300 switches to the configuration of FIG. 2C, the output voltage V_OUT2 remains at an average voltage of ⅔ V_IN2 (as described above in connection with FIG. 2C).

In accordance with another embodiment of the present invention, the above described fractional charge pumps can be generalized to any number of capacitors. The number of capacitors used in a fractional charge pump of the present invention can be defined by the positive integer, N. In the examples described above, N is equal to two. However, any number of capacitors can be used in other embodiments. The capacitors may then be defined by the labels C1 to CN. Assuming there are three or more capacitors, if the input voltage to the fractional charge pump is defined as Vin, and the output voltage provided by the fractional charge pump is defined as Vout, then each series combination of the N capacitors can be described by the following equation. S _(i) *Vin=S _(o) *Vout+S ₁ *V1+S ₂ *V2+. . . S _(N) *VN  [Eqn. 8] wherein V1, V2 . . . VN represent the voltages across capacitors C1, C2 . . . CN, respectively, and the parameters S_(i), S_(o), S₁, S₂ . . . S_(N) are each selected to have one of the values {1, 0, −1}. Under steady state conditions, the voltages V1, V2 . . . VN, Vin and Vout have constant values.

If a parameter S₁, S₂, . . . or S_(N) has a value of “1”, this means that the associated capacitor Cl, C2, . . . or CN is connected and has the “+” terminal oriented towards the input terminal and the “−” terminal towards the output terminal.

If a parameter S₁, S₂, . . . or S_(N) has a value of “−1”, this means that the associated capacitor C1, C2, . . . or CN is connected and has the “−” terminal oriented towards the input terminal and the “+” terminal towards the output terminal.

Finally, if a parameter S₁, S₂, . . . or S_(N) has a value of “0”, this means that the associated capacitor C1, C2, . . . or CN is bypassed (i.e., the capacitor is not connected in the same series path as capacitors having associated parameters equal to ‘1’ or ‘−1’).

The coefficients S_(i) and S_(o) associated with the input voltage Vin and the output voltage Vout can have a value of +1, which signifies input and output are connected to the series of capacitors. The coefficients S_(i) and S_(o) can alternately have a value of 0 (zero) which means input and output are respectively disconnected and their respective pin is grounded. In the described examples, the coefficients S_(i) and S_(O) cannot have a value “−1”, as this value has no useful physical meaning.

In accordance with one embodiment of the present invention, the number of operating phases implemented by a charge pump having N capacitors is selected to be equal to N+1. Thus, a charge pump having two capacitors will have three phases, and a charge pump having three capacitors will have four phases.

Each operating phase of the charge pump can be described by a corresponding equation of the form defined above in equation (8). For example, the N+1 operating phases associated with a charge pump having N capacitors may be represented by the following equation set. S _(i1) *Vin=S _(o1) *Vout+S ₁₁ *V1+S ₁₂ *V2+ . . . S _(1N) *VN S _(i2) *Vin=S _(o2) *Vout+S ₂₁ *V1+S ₂₂ *V2+ . . . S _(2N) *VN S _(i3) *Vin=S _(o3) *Vout+S ₃₁ *V1+S ₃₂ *V2+ . . . S _(3N) *VN . . . S _(i(N+1)) *Vin=S_(o(N+1)) *Vout+S _((N+1)1) *V1+S _((N+1)2) *V2+ . . . S _((N+1)N) *VN  [Eqn. 9]

Because the input voltage Vin is a known constant voltage, equation set [9] represents a linear system with (N+1) unknown values represented by (N+1) equations. This linear system can be solved using (N+1)×(N+1) matrices derived from equation set [9]. The matrix equations used to solve for the voltages Vout, V1, V2 and VN are provided below. $\begin{matrix} {{\begin{matrix} {\quad S_{\quad{i1}}} & {\quad S_{\quad 11}} & {\quad S_{\quad 12}} & \ldots & {\quad S_{\quad{1\quad N}}} \\ {\quad S_{\quad{i2}}} & {\quad S_{\quad 21}} & {\quad S_{\quad 22}} & \ldots & {\quad S_{\quad{2\quad N}}} \\ {\quad S_{\quad{i3}}} & {\quad S_{\quad 31}} & {\quad S_{\quad 32}} & \ldots & {\quad S_{\quad{3\quad N}}} \\ \ldots & \ldots & \ldots & \ldots & \ldots \\ {\quad S_{\quad{i{({N\quad + \quad 1})}}}} & {\quad S_{{({N\quad + \quad 1})}\quad 1}} & {\quad S_{{({N\quad + \quad 1})}\quad 2}} & \ldots & {\quad S_{{({N\quad + \quad 1})}\quad N}} \end{matrix}}{{Vout} = {Vin}^{*}}{\begin{matrix} {\quad S_{\quad{o1}}} & {\quad S_{\quad 11}} & {\quad S_{\quad 12}} & \ldots & {\quad S_{\quad{1\quad N}}} \\ {\quad S_{\quad{o2}}} & {\quad S_{\quad 21}} & {\quad S_{\quad 22}} & \ldots & {\quad S_{\quad{2\quad N}}} \\ {\quad S_{\quad{o3}}} & {\quad S_{\quad 31}} & {\quad S_{\quad 32}} & \ldots & {\quad S_{\quad{3\quad N}}} \\ \ldots & \ldots & \ldots & \ldots & \ldots \\ {\quad S_{\quad{0\quad{({N\quad + \quad 1})}}}} & {\quad S_{{({N\quad + \quad 1})}\quad 1}} & {\quad S_{{({N\quad + \quad 1})}\quad 2}} & \ldots & {\quad S_{{({N\quad + \quad 1})}\quad N}} \end{matrix}}} & \left\lbrack {{Eqn}.\quad 10} \right\rbrack \\ {{\begin{matrix} {\quad S_{\quad{o1}}} & {\quad S_{\quad{i1}}} & {\quad S_{\quad 12}} & \ldots & {\quad S_{\quad{1\quad N}}} \\ {\quad S_{\quad{o2}}} & {\quad S_{\quad{i2}}} & {\quad S_{\quad 22}} & \ldots & {\quad S_{\quad{2\quad N}}} \\ {\quad S_{\quad{03}}} & {\quad S_{\quad{i3}}} & {\quad S_{\quad 32}} & \ldots & {\quad S_{\quad{3\quad N}}} \\ \ldots & \ldots & \ldots & \ldots & \ldots \\ {\quad S_{\quad{0\quad{({N\quad + \quad 1})}}}} & {\quad S_{{i{({N\quad + \quad 1})}}\quad}} & {\quad S_{{({N\quad + \quad 1})}\quad 2}} & \ldots & {\quad S_{{({N\quad + \quad 1})}\quad N}} \end{matrix}}{{V1} = {Vin}^{*}}{\begin{matrix} {\quad S_{\quad{o1}}} & {\quad S_{\quad{11}}} & {\quad S_{\quad 12}} & \ldots & {\quad S_{\quad{1\quad N}}} \\ {\quad S_{\quad{o2}}} & {\quad S_{\quad 21}} & {\quad S_{\quad 22}} & \ldots & {\quad S_{\quad{2\quad N}}} \\ {\quad S_{\quad{o3}}} & {\quad S_{31}} & {\quad S_{\quad 32}} & \ldots & {\quad S_{\quad{3\quad N}}} \\ \ldots & \ldots & \ldots & \ldots & \ldots \\ {\quad S_{\quad{0\quad{({N\quad + \quad 1})}}}} & {\quad S_{{({N\quad + \quad 1})}\quad 1}} & {\quad S_{{({N\quad + \quad 1})}\quad 2}} & \ldots & {\quad S_{{({N\quad + \quad 1})}\quad N}} \end{matrix}}} & \left\lbrack {{Eqn}.\quad 11} \right\rbrack \\ {{\begin{matrix} {\quad S_{\quad{o1}}} & {\quad S_{\quad 11}} & {\quad S_{\quad{i1}}} & \ldots & {\quad S_{\quad{1\quad N}}} \\ {\quad S_{\quad{o2}}} & {\quad S_{\quad 21}} & {\quad S_{\quad{i\quad 2}}} & \ldots & {\quad S_{\quad{2\quad N}}} \\ {\quad S_{\quad{03}}} & {\quad S_{\quad 31}} & {\quad S_{\quad{i\quad 2}}} & \ldots & {\quad S_{\quad{3\quad N}}} \\ \ldots & \ldots & \ldots & \ldots & \ldots \\ {\quad S_{\quad{0\quad{({N\quad + \quad 1})}}}} & {\quad S_{{({N\quad + \quad 1})}\quad 1}} & {\quad S_{{i{({N\quad + \quad 1})}}\quad}} & \ldots & {\quad S_{{({N\quad + \quad 1})}\quad N}} \end{matrix}}{{V\quad 2} = {Vin}^{*}}{\begin{matrix} {\quad S_{\quad{o1}}} & {\quad S_{\quad{11}}} & {\quad S_{\quad 12}} & \ldots & {\quad S_{\quad{1\quad N}}} \\ {\quad S_{\quad{o2}}} & {\quad S_{\quad 21}} & {\quad S_{\quad 22}} & \ldots & {\quad S_{\quad{2\quad N}}} \\ {\quad S_{\quad{o3}}} & {\quad S_{31}} & {\quad S_{\quad 32}} & \ldots & {\quad S_{\quad{3\quad N}}} \\ \ldots & \ldots & \ldots & \ldots & \ldots \\ {\quad S_{\quad{0\quad{({N\quad + \quad 1})}}}} & {\quad S_{{({N\quad + \quad 1})}\quad 1}} & {\quad S_{{({N\quad + \quad 1})}\quad 2}} & \ldots & {\quad S_{{({N\quad + \quad 1})}\quad N}} \end{matrix}}} & \left\lbrack {{Eqn}.\quad 12} \right\rbrack \\ {{\begin{matrix} {\quad S_{\quad{o1}}} & {\quad S_{\quad{11}}} & {\quad S_{\quad 12}} & \ldots & {\quad S_{\quad{i1}}} \\ {\quad S_{\quad{o2}}} & {\quad S_{\quad 21}} & {\quad S_{\quad 22}} & \ldots & {\quad S_{\quad{i2}\quad}} \\ {\quad S_{\quad{03}}} & {\quad S_{31}} & {\quad S_{\quad 32}} & \ldots & {\quad S_{\quad{i3}\quad}} \\ \ldots & \ldots & \ldots & \ldots & \ldots \\ {\quad S_{\quad{0\quad{({N\quad + \quad 1})}}}} & {\quad S_{{({N\quad + \quad 1})}\quad 1}} & {\quad S_{{({N\quad + \quad 1})}\quad 2}} & \ldots & {\quad S_{{i{({N\quad + \quad 1})}}\quad}} \end{matrix}}{{VN} = {Vin}^{*}}{\begin{matrix} {\quad S_{\quad{o1}}} & {\quad S_{\quad{11}}} & {\quad S_{\quad 12}} & \ldots & {\quad S_{\quad{1\quad N}}} \\ {\quad S_{\quad{o2}}} & {\quad S_{\quad 21}} & {\quad S_{\quad 22}} & \ldots & {\quad S_{\quad{2\quad N}}} \\ {\quad S_{\quad{o3}}} & {\quad S_{31}} & {\quad S_{\quad 32}} & \ldots & {\quad S_{\quad{3\quad N}}} \\ \ldots & \ldots & \ldots & \ldots & \ldots \\ {\quad S_{\quad{0\quad{({N\quad + \quad 1})}}}} & {\quad S_{{({N\quad + \quad 1})}\quad 1}} & {\quad S_{{({N\quad + \quad 1})}\quad 2}} & \ldots & {\quad S_{{({N\quad + \quad 1})}\quad N}} \end{matrix}}} & \left\lbrack {{Eqn}.\quad 13} \right\rbrack \end{matrix}$

Several examples will now be provided. The three operating phases of the two capacitor charge pump 200, as represented by FIGS. 2A, 2B and 2C can be defined in the following manner, wherein the operating phases represented by FIGS. 2A, 2B and 2C are described by the following equations (14), (15) and (16), respectively. (1)*V_IN2=(0)*V _(—OUT)2+(1)*V21+(1)*V22  [Eqn. 14] (1)*V_IN2=(1)*V_OUT2+(1)*V21+(0)*V22  [Eqn. 15] (1)*V_IN2=(1)*V_OUT2+(−1)*V21+(1)*V22  [Eqn. 16]

Substituting the coefficients of equations (14)-(16) into equation (10) results in the following. $\begin{matrix} {{\begin{matrix} 1 & 1 & 1 \\ 1 & 1 & 0 \\ 1 & {- 1} & 1 \end{matrix}}{{V{\_ OUT2}} = {{{V{\_ IN2}}^{*}\quad\cdots} = {{V{\_ IN2}}^{*}\quad\left( {{- 2}/{- 3}} \right)}}}{\begin{matrix} {\quad 0} & 1 & 1 \\ 1 & 1 & 0 \\ 1 & {- 1} & 1 \end{matrix}}} & \left\lbrack {{Eqn}.\quad 17} \right\rbrack \end{matrix}$

Substituting the coefficients of equations (14)-(16) into equation (11) results in the following. $\begin{matrix} {{\begin{matrix} 0 & 1 & 1 \\ 1 & 1 & 0 \\ 1 & 1 & 1 \end{matrix}}{{V21} = {{{{V\_ IN}2}^{*}\quad\cdots} = {{V{\_ IN2}}^{*}\quad\left( {{- 1}/{- 3}} \right)}}}{\begin{matrix} 0 & 1 & 1 \\ 1 & 1 & 0 \\ 1 & {- 1} & 1 \end{matrix}}} & \left\lbrack {{Eqn}.\quad 18} \right\rbrack \end{matrix}$

Substituting the coefficients of equations (14)-(16) into equation (12) results in the following. $\begin{matrix} {{\begin{matrix} 0 & 1 & 1 \\ 1 & 1 & 1 \\ 1 & {- 1} & 1 \end{matrix}}{{V22} = {{{V\_ IN2}^{*}\quad\cdots} = {{V\_ IN2}^{*}\quad\left( {{- 2}/{- 3}} \right)}}}{\begin{matrix} 0 & 1 & 1 \\ 1 & 1 & 0 \\ 1 & {- 1} & 1 \end{matrix}}} & \left\lbrack {{Eqn}.\quad 19} \right\rbrack \end{matrix}$

Note that the results provided by equations (17)-(19) concur with the results provided by equations (5)-(7).

In accordance with one embodiment of the present invention, equations (9)-(13) can be used to identify new charge pump configurations, by substituting coefficients until a desired voltage relationship is obtained. For example, a two capacitor, three stage charge pump having a multiplication factor of 0.75 can be implemented using the following coefficients. (1)*Vin=(1)*Vout+(1)*V1+(0)*V2  [Eqn. 20] (0)*Vin=(1)*Vout+(−1)*V1+(−1)*V2  [Eqn. 21] (1)*Vin=(1)*Vout+(−1)*V1+(1)*V2  [Eqn. 22]

FIGS. 7A, 7B and 7C are circuit diagrams that illustrate three operating phases of a charge pump 700 configured in accordance with equations (20), (21) and (22), respectively. Charge pump 700 includes two capacitors C710 and C720, which are configured to provide an output voltage Vout on terminal 702 in response to the input voltage Vin received on terminal 701. Output capacitor C230 and load 240 have been described above in connection with FIGS. 2A-2C. The voltages across capacitors C710 and C720 are labeled V1 and V2, respectively.

Substituting the coefficients of equations (20)-(22) into equation (10) results in the following. $\begin{matrix} {{\begin{matrix} 1 & 1 & 0 \\ 0 & {- 1} & {- 1} \\ 1 & {- 1} & 1 \end{matrix}}{{Vout} = {{{Vin}^{*}\quad\cdots} = {{Vin}^{*}\quad\left( {{- 3}/{- 4}} \right)}}}\quad{\begin{matrix} 1 & 1 & 0 \\ 1 & {- 1} & {- 1} \\ 1 & {- 1} & 1 \end{matrix}}} & \left\lbrack {{Eqn}.\quad 23} \right\rbrack \end{matrix}$

Thus, equation 23 confirms that the charge pump defined by equations (20)-(22) has a multiplication factor of 0.75×. Substituting the coefficients of equations (20)-(22) into equation (11) results in the following. $\begin{matrix} {{\begin{matrix} 1 & 1 & 0 \\ 1 & 0 & {- 1} \\ 1 & 1 & 1 \end{matrix}}{{V1} = {{{{Vi}n}^{*}\quad\cdots} = {{Vin}^{*}\quad\left( {{- 1}/{- 4}} \right)}}}{\begin{matrix} 1 & 1 & 0 \\ 1 & {- 1} & {- 1} \\ 1 & {- 1} & 1 \end{matrix}}} & \left\lbrack {{Eqn}.\quad 24} \right\rbrack \end{matrix}$

Thus, equation 24 indicates that the voltage across the first capacitor C710 has a voltage equal to 0.25 * Vin.

Substituting the coefficients of equations (20)-(22) into equation (12) results in the following. $\begin{matrix} {{\begin{matrix} 1 & 1 & 1 \\ 1 & {- 1} & 0 \\ 1 & {- 1} & 1 \end{matrix}}{{V2} = {{{Vin}^{*}\quad\cdots} = {{Vin}^{*}\quad\left( {{- 2}/{- 4}} \right)}}}{\begin{matrix} 1 & 1 & 0 \\ 1 & {- 1} & {- 1} \\ 1 & {- 1} & 1 \end{matrix}}} & \left\lbrack {{Eqn}.\quad 25} \right\rbrack \end{matrix}$

Thus, equation (25) indicates that the voltage across the second capacitor C720 has a voltage equal to 0.5*Vin. If the input voltage Vin is selected to have a value of 3 Volts, then the output voltage would be about 2.25 Volts, the voltage V1 would be about 0.75 Volts, and the voltage V2 would be about 1.5 Volts.

In a similar manner, a two capacitor, three stage charge pump having a multiplication factor of 1.33 can be implemented by equations using the following coefficients. (1)*Vin=(1)*Vout+(−1)*V1+(0)*V2  [Eqn. 26] (1)*Vin=(0)*Vout+(1)*V1+(1)*V2  [Eqn. 27] (1)*Vin=(1)*Vout+(1)*V1+(−1)*V2  [Eqn. 28]

In accordance with another embodiment, a three capacitor, four stage charge pump having a multiplication factor of 0.7 can be implemented using the following coefficients. (0)*Vin=(1)*Vout+(1)*V1+(1)*V2+(−1)*V3  [Eqn. 29] (1)*Vin=(1)*Vout+(1)*V1+(0)*V2+(1)*V3  [Eqn. 30] (1)*Vin=(1)*Vout+(−1)*V1+(1)*V2+(1)*V3  [Eqn. 31] (1)*Vin=(1)*Vout+(−1)*V1+(−1)*V2+(0)*V3  [Eqn. 32]

FIGS. 8A, 8B, 8C and 8D are circuit diagrams that illustrate four operating phases of a charge pump 800 configured in accordance with equations (29), (30), (31) and (32), respectively. Charge pump 800 includes three capacitors C810, C820 and C830, which are configured to provide an output voltage Vout on terminal 802 in response to the input voltage Vin received on terminal 801. Output capacitor C230 and load 240 have been described above in connection with FIGS. 2A-2C. The voltages across capacitors C810, C820 and C830 are labeled V1, V2, and V3, respectively.

Substituting the coefficients of equations (29)-(32) into equation (10) results in the following. $\begin{matrix} {{\begin{matrix} 0 & 1 & 1 & {- 1} \\ 1 & 1 & 0 & 1 \\ 1 & {- 1} & 1 & 1 \\ 1 & {- 1} & {- 1} & 0 \end{matrix}}{{Vout} = {{{Vin}^{*}\quad\cdots} = {{Vin}^{*}\quad\left( {7/10} \right)}}}{\begin{matrix} 1 & 1 & 1 & {- 1} \\ 1 & 1 & 0 & 1 \\ 1 & {- 1} & 1 & 1 \\ 1 & {- 1} & {- 1} & 0 \end{matrix}}} & \left\lbrack {{Eqn}.\quad 33} \right\rbrack \end{matrix}$

Thus, equation 33 confirms that the charge pump defined by equations 29-32 has a multiplication factor of 0.7×.

Substituting the coefficients of equations (29)-(32) into equation (11) results in the following. $\begin{matrix} {{\begin{matrix} 1 & 0 & 1 & {- 1} \\ 1 & 1 & 0 & 1 \\ 1 & 1 & 1 & 1 \\ 1 & 1 & {- 1} & 0 \end{matrix}}{{V1} = {{{Vin}^{*}\quad\cdots} = {{Vin}^{*}\quad\left( {{- 1}/10} \right)}}}{\begin{matrix} 1 & 1 & 1 & {- 1} \\ 1 & 1 & 0 & 1 \\ 1 & {- 1} & 1 & 1 \\ 1 & {- 1} & {- 1} & 0 \end{matrix}}} & \left\lbrack {{Eqn}.\quad 34} \right\rbrack \end{matrix}$ Thus, equation 34 indicates that the voltage across the first capacitor C810 has a voltage equal to −0.10* Vin.

Substituting the coefficients of equations (29)-(32) into equation (12) results in the following. $\begin{matrix} {{\begin{matrix} 1 & 1 & 0 & {- 1} \\ 1 & 1 & 1 & 1 \\ 1 & {- 1} & 1 & 1 \\ 1 & {- 1} & 1 & 0 \end{matrix}}{{V2} = {{{Vin}^{*}\quad\cdots} = {{Vin}^{*}\quad\left( {{- 2}/10} \right)}}}{\begin{matrix} 1 & 1 & 1 & {- 1} \\ 1 & 1 & 0 & 1 \\ 1 & {- 1} & 1 & 1 \\ 1 & {- 1} & {- 1} & 0 \end{matrix}}} & \left\lbrack {{Eqn}.\quad 35} \right\rbrack \end{matrix}$

Thus, equation (35) indicates that the voltage across the second capacitor C820 has a voltage equal to −0.20*Vin.

Substituting the coefficients of equations (29)-(32) into equation (13) results in the following. $\begin{matrix} {\begin{matrix} {1} & 1 & 1 & {0} \\ {1} & 1 & 0 & {1} \\ {1} & {- 1} & 1 & {1} \\ {1} & {- 1} & {- 1} & {\quad 1} \end{matrix}{{V\quad 3} = {{V\quad{in}*{--{--{--{--{----}}}}}}-={V\quad{in}*\left( {4/10} \right)}}}\begin{matrix} {1} & 1 & 1 & {{- 1}} \\ {1} & 1 & 0 & {1} \\ {1} & {- 1} & 1 & {1} \\ {1} & {- 1} & {- 1} & {\quad 0} \end{matrix}} & \left\lbrack {{Eqn}.\quad 36} \right\rbrack \end{matrix}$

Thus, equation (36) indicates that the voltage across the third capacitor C830 has a voltage equal to 0.40*Vin. If the input voltage Vin is selected to have a value of 3 Volts, then the output voltage would be about 2.1 Volts, the voltage V1 would be about −0.3 Volts, the voltage V2 would be about −0.6 Volts and the voltage V3 would be about 1.2 Volts. Note that the negative voltages V1 and V2 indicate that the polarity of these voltages is reversed (i.e., the capacitor terminals marked with a triangle are negative rather than positive).

In accordance with yet another embodiment, a three capacitor, four stage charge pump having a multiplication factor of 7/6 can be implemented using the following coefficients. (1)*Vin=(0)*Vout+(1)*V1+(1)*V2+(1)*V3  [Eqn. 37] (1)*Vin=(1)*Vout+(0)*V1+(0)*V2+(−1)*V3  [Eqn. 38] (1)*Vin=(1)*Vout+(0)*V1+(−1)*V2+(1)*V3  [39] (1)*Vin=(1)*Vout+(−1)*V1+(1)*V2+(0)*V3  [40]

FIGS. 9A, 9B, 9C and 9D are circuit diagrams that illustrate four operating phases of a charge pump 900 configured in accordance with equations (37), (38), (39) and (40), respectively. Charge pump 900 includes three capacitors C910, C920 and C930, which are configured to provide an output voltage Vout on terminal 902 in response to the input voltage Vin received on terminal 901. Output capacitor C230 and load 240 have been described above in connection with FIGS. 2A-2C. The voltages across capacitors C910, C920 and C930 are labeled V1, V2 and V3, respectively.

Substituting the coefficients of equations (37)-(40) into equation (10) results in the following. $\begin{matrix} {\begin{matrix} {1} & 1 & 1 & {1} \\ {1} & 0 & 0 & {{- 1}} \\ {1} & 0 & {- 1} & {1} \\ {1} & {- 1} & 1 & {0} \end{matrix}{{V\quad{out}} = {{V\quad{in}*{--{--{--{--{----}}}}}}-={V\quad{in}*\left( {7/6} \right)}}}\begin{matrix} {0} & 1 & 1 & {1} \\ {1} & 0 & 0 & {{- 1}} \\ {1} & 0 & {- 1} & {1} \\ {1} & {- 1} & 1 & {0} \end{matrix}} & \left\lbrack {{Eqn}.\quad 41} \right\rbrack \end{matrix}$

Thus, equation (41) confirms that the charge pump defined by equations 37-40 has a multiplication factor of 7/6×.

Substituting the coefficients of equations (37)-(40) into equation (11) results in the following. $\begin{matrix} {\begin{matrix} {0} & 1 & 1 & {1} \\ {1} & 1 & 0 & {{- 1}} \\ {1} & 1 & {- 1} & {1} \\ {1} & {\quad 1} & 1 & {0} \end{matrix}{{V\quad 1} = {{V\quad{in}*{--{--{--{--{----}}}}}}-={V\quad{in}*\left( {3/6} \right)}}}\begin{matrix} {0} & 1 & 1 & {1} \\ {1} & 0 & 0 & {{- 1}} \\ {1} & 0 & {- 1} & {1} \\ {1} & {- 1} & 1 & {0} \end{matrix}} & \left\lbrack {{Eqn}.\quad 42} \right\rbrack \end{matrix}$

Thus, equation (42) indicates that the voltage across the first capacitor C910 has a voltage equal to ½*Vin.

Substituting the coefficients of equations (37)-(40) into equation (12) results in the following. $\begin{matrix} {\begin{matrix} {0} & 1 & 1 & {1} \\ {1} & 0 & 1 & {{- 1}} \\ {1} & 0 & 1 & {1} \\ {1} & {- 1} & {\quad 1} & {0} \end{matrix}{{V\quad 2} = {{V\quad{in}*{--{--{--{--{----}}}}}}-={V\quad{in}*\left( {2/6} \right)}}}\begin{matrix} {0} & 1 & 1 & {1} \\ {1} & 0 & 0 & {{- 1}} \\ {1} & 0 & {- 1} & {1} \\ {1} & {- 1} & 1 & {0} \end{matrix}} & \left\lbrack {{Eqn}.\quad 43} \right\rbrack \end{matrix}$

Thus, equation (43) indicates that the voltage across the second capacitor C920 has a voltage equal to ⅓*Vin.

Substituting the coefficients of equations (37)-(40) into equation (13) results in the following. $\begin{matrix} {\begin{matrix} {0} & 1 & 1 & {1} \\ {1} & 0 & 0 & {1} \\ {1} & 0 & {- 1} & {1} \\ {1} & {- 1} & 1 & {\quad 1} \end{matrix}{{V\quad 3} = {{V\quad{in}*{--{--{--{--{----}}}}}}-={V\quad{in}*\left( {1/6} \right)}}}\begin{matrix} {0} & 1 & 1 & {1} \\ {1} & 0 & 0 & {{- 1}} \\ {1} & 0 & {- 1} & {1} \\ {1} & {- 1} & 1 & {0} \end{matrix}} & \left\lbrack {{Eqn}.\quad 44} \right\rbrack \end{matrix}$

Thus, equation (44) indicates that the voltage across the third capacitor C930 has a voltage equal to ⅙*Vin. If the input voltage Vin is selected to have a value of 3 Volts, then the output voltage would be about 3.5 Volts, the voltage V1 would be about 1.5 Volts, the voltage V2 would be about 1.0 Volts and the voltage V3 would be about 0.5 Volts.

In accordance with another embodiment of the present invention, switches are provided to enable a predetermined set of capacitors to be connected in different manners to implement different charge pump circuits. That is, the capacitors can be switched to implement different charge pumps, effectively providing a charge pump with a programmable output voltage.

FIG. 10 is a circuit diagram of a programmable charge pump circuit 1000 in accordance with one embodiment of the present invention. Programmable charge pump 1000 includes three capcitors C1, C2 and C3, which are configured by switches S1-S17 to provide an output voltage Vout on terminal 1002 in response to the input voltage Vin received on terminal 1001. Output capacitor C230 and load 240 have been described above in connection with FIGS. 2A-2C.

Programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 2A by closing switches S1, S5, S8, and S11, and opening the remaining switches of circuit 1000.

Programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 2B by closing switches S1, S5, S8, S9, S11, and opening the remaining switches of circuit 1000.

Programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 2C by closing switches S3, S7 and S10, and opening the remaining switches of circuit 1000.

Programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 5 by closing switches S1, S5, S6 and S9, and opening the remaining switches of circuit 1000.

Programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 6 by closing switches S9, and S11, and opening the remaining switches of circuit 1000.

Thus, programmable charge pump circuit 1000 can be programmed to implement the two capacitor, three phase ⅔× charge pumps described in FIGS. 2A-2C, 5 and 6.

In addition, programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 7A by closing switches S1, S5, S8, S9 and S11, and opening the remaining switches of circuit 1000.

Programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 7B by closing switches S8, S12 and S11, and opening the remaining switches of circuit 1000.

Programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 7C by closing switches S3, S7 and S10.

Thus, programmable charge pump circuit 1000 can be configured to implement the two capacitor, three phase 34 charge pump described in FIGS. 7A-7C.

In addition, programmable charge pump circuit 900 can be configured to implement the circuit of FIG. 8A by closing switches S14, S4, S16, S10, S15, S17 and S11, and opening the remaining switches of circuit 900.

Programmable charge pump circuit 900 can be configured to implement the circuit of FIG. 8B by closing switches S1, S6, S8 S12 and S17, and opening the remaining switches of circuit 900.

Programmable charge pump circuit 900 can be configured to implement the circuit of FIG. 8C by closing switches S2, S5, S7, S8, S12, S16 and S17, and opening the remaining switches of circuit 900.

Programmable charge pump circuit 900 can be configured to implement the circuit of FIG. 8D by closing switches S3, S4, S5, S9, S11, S13, S15 and S16, and opening the remaining switches of circuit 900.

Thus, programmable charge pump circuit 900 can be configured to implement the three capacitor, four phase 0.7× charge pump described in FIGS. 8A-8D.

In addition, programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 9A by closing switches S1, S4, S16, S8, S17, S15 and S13, and opening the remaining switches of circuit 1000.

Programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 9B by closing switches S3, S10, S15, S17 and S11, and opening the remaining switches of circuit 1000.

Programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 9C by closing switches S3, S16, S7, S9, S17 and S12, and opening the remaining switches of circuit 1000.

Programmable charge pump circuit 1000 can be configured to implement the circuit of FIG. 9D by closing switches S2, S5, S7, S16, S8 and S11, and opening the remaining switches of circuit 1000.

Thus, programmable charge pump circuit 1000 can be configured to implement the three capacitor, four phase 7/6× charge pump described in FIGS. 9A-9D.

Although FIG. 10 illustrates a charge pump circuit 1000 which is programmable to implement any of the circuits illustrated in FIGS. 2A-2C, 5, 6, 7A-7C, 8A-8D and 9A-9D, it is understood that charge pump circuit 1000 can be modified to implement other charge pump circuits in other embodiments of the present invention. It is also understood that charge pump circuit 1000 could be implemented with other numbers of switches and/or capacitors in other embodiments, depending on the charge pumps to be implemented. In another embodiment, the number of switches is minimized to optimize the performance of the programmable charge pump.

Although the present invention has been described in connection with several embodiments, it is understood that this invention is not limited to the embodiments disclosed, but is capable of various modifications that would be apparent to one of ordinary skill in the art. For example, charge pump 200 could include control logic to allow configuration and operation of capacitors C210 and C220 to provide different voltage multiplication factors. Furthermore, the operation of the charge pump 200 can include more phases, for example, a discharge phase from capacitor C220 alone connected to output node 202 and/or a discharge phase with capacitor C210 alone connected between input node 201 and output node 202. Thus, the invention is limited only by the following claims. 

1. A programmable charge pump comprising: an input terminal configured to receive a first supply voltage; an output terminal configured to provide an output voltage; a plurality of capacitors; and interconnection circuitry configured to sequentially couple a first group of the capacitors in a first plurality of configurations, thereby providing a first output voltage on the output terminal, the interconnection circuit further configured to couple a second group of the capacitors in a second plurality of configurations, thereby providing a second output voltage on the output terminal, wherein the first plurality of configurations is different than the second plurality of configurations, and the first output voltage is different than the second output voltage.
 2. The programmable charge pump of claim 1, wherein the first group of the capacitors is identical to the second group of the capacitors.
 3. The programmable charge pump of claim 1, wherein there are N capacitors in the first group of capacitors, and there are N+1 configurations in the first plurality of configurations, wherein N is an integer greater than one.
 4. The programmable charge pump of claim 3, wherein there are N capacitors in the second group of capacitors, and there are N+1 configurations in the second plurality of configurations.
 5. The programmable charge pump of claim 3, wherein there are N+1 capacitors in the second group of capacitors, and there are N+2 configurations in the second plurality of configurations.
 6. A programmable charge pump comprising: a first terminal configured to receive a first supply voltage a second terminal configured to receive a second supply voltage; an output terminal configured to provide an output voltage; a first capacitor; a second capacitor; and interconnection circuitry for wiring the first capacitor and the second capacitor in a first configuration, a second configuration and a third configuration, wherein in the first configuration, the first capacitor is coupled in series between the first terminal and the output terminal, wherein in the second configuration, the first and second capacitors are coupled in series between the second terminal and the output terminal, and wherein in the third configuration, the first and second capacitors are coupled in series between the first terminal and the output terminal.
 7. The charge pump of claim 6, wherein the first capacitor has a first orientation with respect to the first terminal in the first configuration, and a second orientation, opposite the first orientation, with respect to the first in the third configuration.
 8. The charge pump of claim 7, wherein the first capacitor has a first orientation with respect to the output terminal in the first configuration, and a second orientation, opposite the first orientation, with respect to the output terminal in the second and third configurations.
 9. The charge pump of claim 7, wherein the second capacitor has a first orientation with respect to the output terminal in the second configuration, and a second orientation, opposite the first orientation, with respect to the output terminal in the third configuration.
 10. The charge pump of claim 6, wherein in the first configuration, the first and second capacitors are coupled in series between the first terminal and the second terminal.
 11. The charge pump of claim 10, wherein the second capacitor has the same orientation with respect to the first terminal in the first and third configurations.
 12. The charge pump of claim 6, wherein the output voltage is about 0.75 times the first supply voltage.
 13. The charge pump of claim 6, wherein in the second configuration, the first and second capacitors are isolated from the first terminal.
 14. The charge pump of claim 6, wherein in the third configuration, the first and second capacitors are isolated from the second terminal.
 15. The charge pump of claim 6, further comprising an output capacitor which remains coupled to the output terminal in the first, second and third configurations.
 16. The charge pump of claim 6, further comprising control logic for cycling the charge pump through the first, second and third configurations in a repeating sequence.
 17. A method of operating a charge pump comprising: receiving a first voltage on a first input terminal; receiving a second voltage on a second input terminal; providing an output voltage on an output terminal; coupling a first capacitor and a second capacitor in a first configuration, wherein the first capacitor is coupled in series between the first input terminal and the output terminal; coupling the first capacitor and the second capacitor in a second configuration, wherein the first and second capacitors are coupled in series between the second input terminal and the output terminal; coupling the first capacitor and the second capacitor in a third configuration, wherein the first and second capacitors are coupled in series between the first input terminal and the output terminal. wherein the output voltage provided on the output terminal is less than the first voltage.
 18. The method of claim 17, further comprising coupling the first capacitor and the second capacitor in series between the first and second input terminals in the first configuration.
 19. The method of claim 17, further comprising coupling the first capacitor in a first orientation with respect to the first input terminal in the first configuration, and coupling the first capacitor in a second orientation, opposite the first orientation, with respect to the first input terminal in the third configuration.
 20. The method of claim 19, further comprising coupling the first capacitor in a first orientation with respect to the output terminal in the first configuration, and coupling the first capacitor in a second orientation, opposite the first orientation, with respect to the output terminal in the second and third configurations.
 21. The method of claim 19, further comprising coupling the second capacitor in a first orientation with respect to the output terminal in the second configuration, and coupling the second capacitor in a second orientation, opposite the first orientation, with respect to the output terminal in the third configuration.
 22. The method of claim 17, further comprising de-coupling the first and second capacitors from the first input terminal during in the second configuration.
 23. The method of claim 17, wherein the average output voltage provided at the output terminal is substantially equal to ¾ the first voltage.
 24. The method of claim 17, further comprising coupling an output capacitor to the output terminal in the first, second and third configurations.
 25. The method of claim 17, further comprising cycling through the first, second, and third configurations in a repeating sequence.
 26. A method of designing a charge pump comprising: selecting a number (N) of capacitors to implement the charge pump, wherein N is greater than or equal to two; modeling N+1 operating phases of the charge pump with N+1 corresponding linear equations, wherein each of the N+1 linear equations includes an input voltage of the charge pump, an output voltage of the charge pump, N capacitor voltages, each associated with a corresponding one of the N capacitors, and coefficients associated with the input voltage, the output voltage and the N capacitor voltages, wherein each of the coefficients identifies a corresponding configuration of the input voltage, the output voltage and the capacitor voltages, and wherein the N+1 linear equations define a linear system; assigning a plurality of different sets of coefficients to the N+1 linear equations; solving the N+1 linear equations for each of the different sets of coefficients, thereby obtaining a charge pump multiplication factor that identifies a ratio of the input voltage to the output voltage for each of the different sets of coefficients; monitoring the charge pump multiplication factors obtained from each of the different sets of coefficients to identify charge pump multiplication factors that exist within a desired range.
 27. The method of claim 26, wherein the step of assigning a plurality of different sets of coefficients to the N+1 linear equations comprises randomly assigning a plurality of different sets of coefficients to the N+1 linear equations.
 28. The method of claim 26, wherein a coefficient associated with the input voltage identifies whether or not an input terminal configured to receive the input voltage is coupled or de-coupled from the charge pump in the associated operating phase, and wherein a coefficient associated with the output voltage identifies whether or not an output terminal configured to provide the output voltage is coupled or de-coupled from the charge pump in the associated operating phase.
 29. The method of claim 27, wherein the coefficients associated with the input and output voltages are binary values.
 30. The method of claim 28, wherein coefficients associated with the capacitor voltages identify whether the corresponding capacitors are connected in a first orientation between the input terminal and the output terminal, connected in a second orientation, opposite the first orientation, between the input terminal and the output terminal, or de-coupled from a path between the input terminal and the output terminal.
 31. The method of claim 28, wherein the coefficients associated with the capacitor voltages are 1, 0 and −1. 